The equation `x^2 + px +9= 0` has roots equal to p and q where `q != 0`. What are the values of p and q respectively?

If p and q are the root of the equation x^(2) - px + q = 0 , then what are the vlaues of p and q respectively ?

One root of the equation x^(2) = px +q is reciprocal of the other and p!=pm1 . What is the value of q ?

Two numbers p and q are such that the quadratic equation px^2 + 3x + 2q = 0 has -6 as the sum and the product of the roots. What is the value of (p-q) ?

Given that 2 is a root of the equation 3x^(2)-p(x+1)=0 and that the equation px^(2)-qx+9=0 has equal roots,find the values of p and q

If -4 is a root of the equation x^(2)+px-4=0 and the equation x^(2)+px+q=0 has coincident roots, find the values of p and q.

Two numbers p and q are such that the equation px^(2)+3x+2q=0 has -6 as the sum of roots and 2 as the product of roots, then find the values of p and q.